Distributed Storage for Intermittent Energy Sources: Control Design and Performance Limits

1. Distributed Storage for Intermittent Energy Sources: Control Design and Performance Limits YashodhanKanoria Stanford University Joint work with: Andrea Montanari, David Tse and Baosen Zhang

2. The challenge of renewables • Intermittent • Intrinsically distributed How to manage? The paper

3. The challenge of renewables • Intermittent • Intrinsically distributed How to manage? This talk

4. Questions? • Optimal control of grid with transmission and storage? • Infrastructure improvement: • New transmission line? Upgrade in existing line? • New storage facility? • New generation? Which will help more? How to optimally allocate budget?

5. Our contribution • Control design for discrete time model • Analytical insights quantifying benefits of storage, transmission and overprovisioning

6. Model 3 2 1 4

7. Model = Electric load 3 2 1 4

8. Model = Renewable sources 3 2 1 4

9. Model 3 2 1 4 −

10. Model 3 2 1 4

11. Model 3 2 1 4

12. Model 3 2 1 4

13. Model 3 3 2 2 2 1 1 1 4 4 4

14. Model Energy pushed into

15. Model • Control inputs: • Dependent variables: • Flows • Storage buffers

16. Constraints • Storage capacity constraintsHard constraint • Transmission constraintsSoft constraint

17. Cost function • Cost of fast generation(free disposal of energy) • Cost of violating transmission constraints • Performance criterion: 0 -Ce Ce

18. What’s the issue? • Centralized control problem • is linear function of controls • Storage constraints cause thresholding • Non-quadratic cost function Idea: Use surrogate cost function (drop storage constraints for now) X X

19. The surrogate problem • ‘State’ consisting of buffer sizes • ‘Noise’ • State and noise fully observed • Linear state evolution • Quadratic cost • Assume is Gaussian We have an LQG problem! • Can be solved numerically yielding control scheme • Can be mapped back to original problem

20. The surrogate LQG problem • Is the scheme any good? • Any insights into roles of storage and transmission?

21. Specific networks • Transmission network is almost a tree • What happens on an infinite line? • What about a two-dimensional grid?

22. 1-D and 2-D grids Assume: • Storage at each node • Capacity on each line • iid

23. Storage Transmission 1-D and 2-D grids We find, for original problem: • Analytical expressions for cost of LQG-based schemes • Fundamental limits LQG is near optimal

24. Storage Transmission Results

25. Storage Transmission Results

26. Storage Transmission Results

27. Storage Transmission Results

28. Storage Transmission Results

29. Storage Transmission Results

30. Storage Transmission Results

31. Storage Transmission Results and together works best!

32. Storage Transmission Results

33. Storage Transmission Results

34. Storage Transmission Results Averaging over 2-D much more effective than 1-D

35. Storage Transmission Results seems to provide extra dimension for averaging! Intuition: Time is like extra spatial dimension

36. Storage Transmission Results

37. Storage Transmission Results

38. Spatial averaging is much easier in 2-D 1-D Segment of length 2-D Square of side

39. Conclusions and future work • Gaussian assumption optimistic • But key insights should remain valid: • 2-D averaging much better than 1-D • Sfacilitates averaging over extra dimension • In the paper: A little overprovisioning can go a long way

40. Thank you!